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I am just creating an algorithm to detect bipartite graphs, but I thought of some graph which I am not sure counts as bipartite, though my algorithm is saying it is.

The graph goes like

(A)--(B)

(C)

So this has 3 nodes but there is 1 edge between only A and B. Is this actually bipartite?

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Yes, it is. You can divide the nodes into two sets, such that all edges go between the two sets. F'rinstance, {A} and {B,C}. –  Beta Mar 31 '13 at 0:54
    
So a node from one set doesn't actually have to connect to the the other set? –  omega Mar 31 '13 at 1:16
    
Correct. (And a comment can't be only eight characters.) –  Beta Mar 31 '13 at 2:20
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1 Answer

Yes, your sample graph really is bipartite.

See, for example, the Wikipedia article which states in the introductory sentence...

In the mathematical field of graph theory, a bipartite graph (or bigraph) is a graph whose vertices can be divided into two disjoint sets U and V such that every edge connects a vertex in U to one in V; that is, U and V are each independent sets. Equivalently, a bipartite graph is a graph that does not contain any odd-length cycles.

There are two ways you could divide this graph ("{A,C}, {B}" or "{B,C}, {A}") which would meet the conditions required for a bipartite graph.

There is no requirement for a bipartite graph to be a connected graph.

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